Title :
On the convergence of a class of estimation of distribution algorithms
Author :
Zhang, Qingfu ; Mühlenbein, Heinz
Author_Institution :
Dept. of Comput. Sci., Essex Univ., Colchester, UK
fDate :
4/1/2004 12:00:00 AM
Abstract :
We investigate the global convergence of estimation of distribution algorithms (EDAs). In EDAs, the distribution is estimated from a set of selected elements, i.e., the parent set, and then the estimated distribution model is used to generate new elements. In this paper, we prove that: 1) if the distribution of the new elements matches that of the parent set exactly, the algorithms will converge to the global optimum under three widely used selection schemes and 2) a factorized distribution algorithm converges globally under proportional selection.
Keywords :
convergence of numerical methods; evolutionary computation; set theory; convergence; distribution algorithm estimation; factorized distribution algorithm; parent set; Bayesian methods; Clustering algorithms; Convergence; Electronic design automation and methodology; Evolutionary computation; Genetic algorithms; Genetic mutations; Genetic programming; Mutual information; Search problems;
Journal_Title :
Evolutionary Computation, IEEE Transactions on
DOI :
10.1109/TEVC.2003.820663
